University of Wisconsin–Madison
Economics 101
Summer 2012
Answers to Homework #5
Due 6/20/12
Directions: The homework will be collected in a box before the lecture. Please place your name, TA name and section number on top of the homework (legibly). Make sure you write your name as it appears on your ID so that you can receive the correct grade. Late homework will not be accepted so make plans ahead of time. Please show your work. Good luck!
Please realize that you are essentially creating “your brand” when you submit this homework. Do you want your homework to convey that you are competent, careful, professional? Or, do you want to convey the image that you are careless, sloppy, and less than professional. For the rest of your life you will be creating your brand: please think about what you are saying about yourself when you do any work for someone else!
1. Consider a monopolist where the market demand curve for the produce is given by P = 520 – 2Q. This monopolist has marginal costs that can be expressed as MC = 100 + 2Q and total costs that can be expressed as TC = 100Q + Q2 + 50.
a. Given the above information, what is this monopolist’s profit maximizing price and output if it charges a single price?
Answer:
MR = 520 – 4Q
MC = 100 + 2Q
520 – 4Q = 100 + 2Q
Q = 70 units of output
P = 520 – 2Q = 520 – 2(70) = $380 per unit of output
b. Given the above information, calculate this single price monopolist’s profit.
Answer:
Profit = TR – TC
TR = P*Q = ($380 per unit)(70 units) = $26,600
TC = 100Q + Q2 + 50 = 100(70) + (70)(70) + 50 = $11,950
Profit = $14650
c. At the profit maximizing quantity, what is this monopolist’s average total cost of production (ATC)?
Answer:
To answer this question we first need to write an expression for ATC.
ATC = TC/Q = 100 + Q + (50/Q)
Then replace Q with 70 to find the average total cost of producing 70 units of output.
ATC= 100 + 70 + (50/70) = $170.71 per unit
d. At the profit maximizing quantity, what is the profit per unit for this single price monopolist?
Answer:
Profit per unit = Price per unit – ATC per unit when producing 70 units of output
Profit per unit = 380 –170.71 = $209.29 per unit
To verify your answer, check that profit per unit times number of units yields the same profit as you got initially. Thus, Profit = (profit per unit)(number of units produced) = ($209.29)(70) = $14650
2. Consider a monopolist described by the following equations:
Market demand for monopolist’s product: P = 100 – Q
ATC for monopolist: ATC = 20 +(3/10) Q
MC for monopolist: MC = 20 + (3/5)Q
In this question we will use the above data to compare a single price monopolist to the same monopolist that is regulated either with average cost regulation or marginal cost regulation. At the end of the question you will fill out a table to compare your results.
a. Given the above information, what is the profit maximizing price and quantity for the single price monopolist? You should round your answers to the nearest whole number.
Answer:
To find the profit maximizing quantity for a single price monopolist you want to equate MR to MC. MR = 100 – 2Q. So,
100 – 2Q = 20 + (3/5)Q
400/13 = Q
Q = 30.8 or approximately 31 units
P = 100 – 31 = $69
b. Given the above information, what is the level of profit for this single price monopolist?
Answer:
To find the firm’s profit you will need to have TR and TC.
TR = P*Q = (69)(31) = $2139
TC = 20Q + (3/10)Q2 = (20)(31) +(3/10) (31)(31) =908.3
Profit = TR – TC = $1230.7
c. Suppose this monopolist is regulated to produce at that quantity where price equals average total cost. Calculate the quantity the monopolist will produce and the price it will charge given this regulatory scenario.
Answer:
To find the quantity where price equals average total cost use the demand curve and the average total cost curve. Hence, 100 – Q = 20 +(3/10) Q or Q = 800/13 units=61.5units. Use the demand curve to find the price associated with 40 units of output. Thus, P = 100 – Q = 100 – 800/13 = $500/13=38.5.
d. Calculate the level of profits for the monopoly if it is regulated to produce that quantity where price equals average total cost. Explain how you got your answer.
Answer:
To find the firm’s profit you will need to have TR and TC.
TR = (800/13)(500/13) = $2367
TC = (20)(800/13) +(3/10) (800/13)(800/13) = $2367
Profit = TR – TC = $0
e. Suppose this monopolist is regulated to produce at that quantity where price equals marginal cost. Calculate the quantity the monopolist will produce and the price it will charge given this regulatory scenario.
Answer:
Use the demand curve and the MC curve to solve for the quantity.
100 – Q = 20 + (3/5)Q
500 – 5Q = 100 + 3Q
400 = 8Q
Q = 50 units
P = 100 – 50 = $50
f. Calculate the level of profits for the monopoly if it is regulated to produce that quantity where price equals marginal cost.
Answer:
Profit = TR – TC
TR = (50)(50) = $2500
TC = (20)(50) +(3/10) (50)(50) = $1750
Profit = $2500 - $1750 = $750
g. How big a subsidy will the monopoly require in order to be willing to produce at the price and quantity you calculated in part (e)? Explain your answer.
Answer:
The monopolist will not need to receive a subsidy since when he produces where MR = P in this example he earns a positive profit of $750. Unlike the example in class, this monopolist is not experiencing increasing returns to scale: this is not a natural monopolist.
h. Fill in the table below with your findings. Remember that a firm is allocatively efficient if price is equal to marginal cost for the last unit of the good produced by the firm.
| |Single Price Monopolist |Monopolist regulated with Average |Monopolist regulated with Marginal |
| | |Cost Regulation |Cost Regulation |
|Price | | | |
|Quantity | | | |
|Profits | | | |
|Subsidy Needed to Produce | | | |
|Allocatively Efficient? | | | |
Answer:
| |Single Price Monopolist |Monopolist regulated with Average |Monopolist regulated with Marginal |
| | |Cost Regulation |Cost Regulation |
|Price |$69 |$38.5 |$50 |
|Quantity |31 |61.5 |50 |
|Profits |$1230.7 |$0 |$750 |
|Subsidy Needed to Produce |None |None |None |
|Allocatively Efficient? |No, P is greater than MC for the |No, P is less than MC for the last |Yes, P is equal to MC for the last |
| |last unit produced when the firm |unit produced when the firm produces|unit produced when the firm produces|
| |produces 31 units |61.5 units |50 units |
3. Consider two students, Jaeho and Lawrence. Both students are taking an exam in their math class this week and they are both, independently, trying to decide whether they will conceal their answers or reveal their answers while working on the exam. It takes time and effort to conceal answers so both students realize that revealing their answers will allow them to concentrate more fully on the exam. In addition, they both realize that if the other student reveals their answers they may potentially improve their scores. Jaeho knows that he is conceals his answers he will get a 60 on the exam and if he does not conceal his answers he will get a 65 provided that Lawrence conceals his answers. Jaeho knows that he will make a 75 on the exam if he conceals his answers while Lawrence reveals his answers; Jaeho will make an 80 on the exam if both Jaeho and Lawrence do not conceal their answers. Lawrence believes he will make an 80 on the exam he both students conceal their answers, an 85 on the exam if he conceals his answers while Jaeho reveals his answers, an 85 on the exam if he reveals his answers while Jaeho does not reveal his answers, and an 87 on the exam if both students do not conceal their answers.
a. Construct a payoff matrix for Jaeho and Lawrence. In the payoff matrix identify the two strategies that both students face and then enter their payoffs with Jaeho’s payoff the first number and Lawrence’s payoff the second number. Label this payoff matrix fully and completely.
b. Does Jaeho have a dominant strategy with regard to concealing or revealing his answers? Explain your answer.
c. Does Lawrence have a dominant strategy with regard to concealing or revealing his answers? Explain your answer.
d. What do you predict will be Jaeho’s and Lawrence’s scores on the exam? Explain your answer.
Answer:
a.
Lawrence
| |Conceal Answers |Reveal Answers |
|Conceal Answers |60, 80 |75, 85 |
|Reveal Answers |65, 85 |80, 87 |
b. Jaeho’s dominant strategy is to reveal his answers: whatever Lawrence chooses to do strategically, Jaeho’s score is higher when he reveals his answers.
c. Lawrence’s dominant strategy is to reveal his answers: whatever Jaeho chooses to do strategically, Lawrence’s score is higher when he reveals his answers.
d. If both players use their dominant strategy they will both reveal their answers and Jaeho will get an 80 on the exam while Lawrence gets an 87.
4. Consider a monopoly that faces a market demand curve given as P = 100 – Q. The marginal cost of production for this monopolist is MC = 10 and the monopolist has fixed costs equal to zero. The monopolist has asked you to compare what happens if the monopolist is a single-price monopolist, a second degree price discriminating monopolist, and a perfect price discriminating monopolist. At the end of this question you will be asked to fill out a table to summarize your findings.
i) Single-price monopolist:
Suppose the monopolist charges a single-price for its product. Given this assumption, find the answers to the following questions:
a. What is the profit maximizing quantity and price for this single-price monopolist?
Answer:
To find the profit maximizing quantity and price we first need the MR curve for the monopolist.
MR = 100 – 2Q
Then, set MR = MC to solve for Q:
100 – 2Q = 10 or Q = 45
When Q = 45, then P = 100 – Q = 100 – 45 or P = $55
b. What is total revenue (TR) equal to for this monopolist?
Answer:
TR = ($55 per unit)(45 units) = $2475
c. What is total cost (TC) equal to for this monopolist?
Answer:
TC = ($10 per unit)(45 units) = $450
d. What are the economic profits for this single-price monopolist?
Answer:
Profits = TR – TC = $2475 - $450 = $2025
e. What is the value of consumer surplus (CSm) for this monopolist?
Answer:
CSm = (1/2)($100 per unit - $55 per unit)(45 units) = $1012.50
f. What is the value of producer surplus (PSm) for this monopolist?
Answer:
PSm = ($55 per unit - $10 per unit)(45 units) = $2025
g. What is the deadweight loss (DWLm) equal to for this monopolist?
Answer:
DWLm = (1/2)($55 per unit - $10 per unit)(90 units – 45 units) = $1012.50
h. Provide a graph of this single-price monopolist indicating CSm, PSm, DWLm, the profit maximizing quantity, and the profit maximizing price.
Answer:
[pic]
ii) Second-degree price discriminating monopolist:
Suppose the monopolist charges two different prices: $80 and $55. Given this assumption, find the answers to the following questions:
i. How many units of the good will the monopolist sell at $80 per unit?
Answer:
Use the demand curve to figure this question out. If price is equal to $80 then P = 100 – Q tells us that Q = 20 units. If price is equal to $55 then P = 100 – Q tells us that total production by the firm will be 45 units. Since the first 20 units of the good are sold at $80, that implies that the next twenty five units will be sold at $55.
j. How many units of the good will the monopolist sell at $55 per unit?
Answer:
Use the demand curve to figure this question out. If price is equal to $80 then P = 100 – Q tells us that Q = 20 units. If price is equal to $55 then P = 100 – Q tells us that total production by the firm will be 45 units. Since the first 20 units of the good are sold at $80, that implies that the next twenty five units will be sold at $55.
k. What is total revenue (TR) for this monopolist when he practices second degree price discrimination as described?
Answer:
TR = ($80 per unit)(20 units) + ($55 per unit)(25 units) = $2975
l. What is total cost (TC) for this monopolist when he practices second degree price discrimination as described?
Answer:
TC = ($10 per unit)(45 units) = $450
m. What are the economic profits for this second degree price discriminating monopolist?
Answer:
Economics profits = TR – TC = $2975 - $450 = $2525
n. What is the value of consumer surplus (CS2) for this monopolist?
Answer:
CS2 = (1/2)($100 per unit - $80 per unit)(20 units) + (1/2)($80 per unit - $55 per unit)(25 units) = $512.50
o. What is the value of producer surplus (PS2) for this monopolist?
Answer:
PS2 = ($80 per unit - $10 per unit)(20 units) + ($55 per unit - $10 per unit)(25 units) = $2525
p. What is the deadweight loss (DWL2) equal to for this monopolist?
Answer:
DWL2 = (1/2)($55 per unit - $10 per unit)(90 units – 45 units) = $1012.50
q. Provide a graph of this second degree price discriminating monopolist indicating CS2, PS2, DWL2, as well as the prices and quantities that the monopolist selects.
Answer:
[pic]
iii) Perfect price discriminating monopolist:
Suppose the monopolist practices perfect price discrimination. Given this assumption, find the answers to the following questions:
r. How many units will the perfect price discriminating monopolist produce?
Answer:
The perfect price discriminating monopolist will produce that quantity where its MR = MC. For the perfect price discriminating monopolist its MR curve is the same as its demand curve since for every unit of the good it produces it charges a price equal to the price on the demand curve associated with that quantity. Hence, the perfect price discriminating monopolist will produce where 100 – Q = 10 or where Q = 90 units.
s. Describe the price(s) the perfect price discriminating monopolist will charge.
Answer:
The perfect price discriminating monopolist will charge many, different prices. For example, for the first unit of the good the monopolist will charge a price of $99 since P = 100 – Q and Q = 1. For the second unit of the good the monopolist will charge a price of $98 since P = 100 – Q’ and Q’ = 2. When producing the ninetieth unit the monopolist will charge a price of $10.
t. What is the value of consumer surplus (CSppd) for this perfect price discriminating monopolist?
Answer:
There is no CSppd when the monopolist practices perfect price discrimination because the monopolist captures all of the consumer surplus.
u. What is the value of producer surplus (PSppd) for this perfect price discriminating monopolist?
Answer:
PSppd = (1/2)($100 per unit - $10 per unit)(90 units) = $4050
v. What is the value of deadweight loss (DWLppd) for this perfect price discriminating monopolist?
Answer:
DWLppd = $0 since the perfect price discriminating monopolist produces the allocatively efficient amount of the good where the MR from the last unit produced is equal to the MC of producing this last unit of the good.
w. What do economic profits equal for this perfect price discriminating monopolist? Show your work to get this answer.
Answer:
Economic profit = TR – TC = ($4050 + $900) – ($10 per unit)(90 units) = $4050
x. Draw a diagram graph of this perfect price discriminating monopolist indicating PSppd, DWLppd, as quantity that the monopolist selects.
Answer:
[pic]
y. Fill in the following summary table:
| |Single Price Monopolist |Second Degree Price Discriminating |Perfect Price Discriminating |
| | |Monopolist |Monopolist |
|Profit Maximizing Price | | | |
|Profit Maximizing Quantity | | | |
|Total Revenue | | | |
|Total Cost | | | |
|Economic Profit | | | |
|Consumer Surplus | | | |
|Producer Surplus | | | |
|Deadweight Loss | | | |
Answer:
| |Single Price Monopolist |Second Degree Price Discriminating |Perfect Price Discriminating |
| | |Monopolist |Monopolist |
|Profit Maximizing Price |$55 |$80 and $55 |Varies, each unit sold for a |
| | | |different price |
|Profit Maximizing Quantity |45 units |20 units at $80 and 25 units at $55|90 units |
|Total Revenue |$2475 |$2975 |$4950 |
|Total Cost |$450 |$450 |$900 |
|Economic Profit |$2025 |$2525 |$4050 |
|Consumer Surplus |$1012.50 |$512.50 |$0 |
|Producer Surplus |$2025 |$2525 |$4050 |
|Deadweight Loss |$1012.50 |$1012.50 |$0 |
5. Suppose a market is characterized as having two different classes of buyers: Class One and Class Two. Furthermore suppose there is only one producer serving this market and this producer has fixed costs equal to $20 and Marginal Cost equal to 1 (MC = 1). The two classes of buyers are described by the following demand curves:
Class One: P = 10 – Q
Class Two: P = 20 – Q
For each of the questions below show your work and reasoning.
Suppose that the monopolist decides to produce the good and sell it for a single price.
a. What is the market demand curve for this single price monopolist?
Answer:
For Price greater than or equal to $10, the market demand curve is P = 20 – Q.
For Price less than or equal to $10, the market demand curve is P = 15 – (1/2)Q
b. What is the marginal revenue curve for this single price monopolist?
Answer:
For price greater than or equal to $10, the marginal revenue curve is MR = 20 – 2Q.
For price less than or equal to $10, the marginal revenue curve is MR = 15 – Q.
c. What is the profit maximizing quantity for this single price monopolist to produce?
Answer:
To find the profit maximizing quantity set MR = MC. 15 – Q = 1 or Q = 14.
d. What is the profit maximizing price for this single price monopolist?
Answer:
To find the profit maximizing price use the quantity from (c) and the monopolist’s demand curve: P = 15 – (1/2)(14) = $8.
e. What is total revenue (TR) for this single price monopolist?
Answer:
TR = P*Q = ($8 per unit)(14 units) = $112
f. What is total cost (TC) for this single price monopolist?
Answer:
TC = VC + FC = ($1 per unit)(14 units) + $20 = $34
g. What is the economic profit for this single price monopolist?
Answer:
Economic Profit = TR – TC = $112 - $34 = $78
Now, suppose this monopolist decides to produce this profit maximizing level of output, but sell part of this output to Class One and the rest of the production to Class Two. Assume these two classes are easily to identify, that there are no costs to identifying the two classes, and that the two classes cannot resell the good to the other class.
h. What is the marginal revenue curve for Class One and what is the marginal revenue curve for Class Two?
Answer:
The marginal revenue curve for Class One is MR1 = 10 – 2Q and the marginal revenue for Class Two is MR2 = 20 – 2Q. Remember that the marginal revenue curve for a linear demand curve has the same y-intercept as the demand curve and a slope that is twice the slope of the demand curve.
i. What is the profit maximizing quantity to sell to Class One? What price should this quantity be sold for?
Answer:
To find the profit maximizing quantity to sell in Class One equate the MR for Class One to the MC. Thus, 10 – 2Q = 1 or Q = 4.5 units. To find the profit maximizing price use this quantity and demand curve for Class One: P = 10 – Q = 10 – 4.5 = $5.50 per unit sold.
j. What is the profit maximizing quantity to sell to Class Two? What price should this quantity be fold for?
Answer:
To find the profit maximizing quantity to sell in Class Two equate the MR for Class Two to the MC. Thus, 20 – 2Q = 1 of Q = 9.5 units. To find the profit maximizing price use this quantity and demand curve for Class Two: P = 20 – Q = 20 – 9.5 = $10.50 per unit sold.
k. Does the sum of the quantity sold to Class One plus the quantity sold to Class Two equal the profit maximizing amount you found in (c)?
Answer:
Quantity sold in Class One + Quantity sold in Class Two = 4.5 + 9.5 = 14 units which is the same quantity as we found in (c) as the profit maximizing quantity if the firm is a single price monopolist.
l. Calculate the total revenue, total cost, and economic profit for Class One. Assume fixed cost is divided evenly between the two classes.
Answer:
Total revenue for Class One is equal to ($5.50 per unit)(4.5 units) = $24.75
Total Cost for Class One is equal to (1/2)FC + VC = (1/2)($20) + ($1 per unit)(4.5 units) = $14.50
Economic Profit for Class One = TR – TC = $24.75 - $14.50 = $10.25.
m. Calculate the total revenue, total cost, and economic profit for Class Two. Assume fixed cost is divided evenly between the two classes.
Answer:
Total revenue for Class Two is equal to ($10.50 per unit)(9.5 units) = $99.75
Total Cost for Class Two is equal to (1/2)FC + VC = (1/2)($20) + ($1 per unit)(9.5 units) = $19.50
Economic Profit for Class Two = TR – TC = $99.75 - $19.50 = $80.25
n. What do total profits equal for the monopolist when he practices third degree price discrimination?
Answer:
Total profits for the monopolist when he practices third degree price discrimination = economic profit from Class One + economic profit from Class Two = $10.25 + $80.25 = $90.50
o. Is it worth price discriminating for this monopolist? Explain your answer.
Answer:
Yes it is worthwhile since the monopolist will earn an extra $12.50 in economic profit by practicing third degree price discrimination.
6. Consider the market for education. The marginal social cost of education (MSC) and the marginal private benefit of education (MPB) are given by the following equations where Q is the number of units of education provided per year.
MSC = 10 + Q
MPB = 100 – Q
You are also told that each unit of education provides an external benefit to society of $10 per unit. This external benefit is currently not being internalized in the market.
a. Given the MSC and MPB curves, what is the current number of education units being produced by the market?
Answer:
Since the external benefits are not being currently internalized in the market this means that the market is producing where MSC = MPB. Or, 10 + Q = 100 – Q and Q is therefore equal to 45 units of education.
b. Is the current level of market production for education the socially optimal amount of education? Explain your answer.
Answer:
No, this is not the socially optimal amount of education to produce since when Q = 45 the MSC of producing the 45th unit of education is equal to $55 while the MSB of producing the 45th unit of education is equal to MPB + $10 or 100 – 45 + 10 for a MSB of $65. Since the MSB is greater than the MSC at 45 units of production this tells us that more units of education should be produced. It also indicates that there should be a deadweight loss associated with this level of production since the MSC for the last unit is not equal to the MSB of the last unit.
c. What is the value of consumer surplus (CS), the value of producer surplus (PS), and the value of the external benefits of the current level of production. Sum together (CS + PS + external benefits). Draw a diagram illustrating each of these concepts in the market for education.
Answer:
CS = (1/2)($100 per unit - $55 per unit)(45 units) = $1012.50
PS = (1/2)($55 per unit - $10 per unit)(45 units) = $1012.50
External benefits = (Benefits per unit)(# of units) = ($10 per unit)(45 units) = $450
CS + PS + external benefits = $2475
[pic]
d. Given the market level of production, what is the deadweight loss in this market?
Answer:
To calculate the DWL you will need to find the Q that corresponds to where MSC = MSB. MSB = MPB + 10 or MSB = 100 – Q + 10 = 110 – Q. Thus, 10 + Q = 110 + Q or Q = 50. DWL = (1/2)($65 per unit - $55 per unit)(50 units – 45 units) = $25.
e. Suppose that the external benefit is internalized in this market when the government provides a subsidy of $10 per educational unit to consumers. What will be the socially optimal amount of education to provide given this subsidy?
Answer:
The socially optimal amount of education to provide is where MSC = MSB. From our calculation in (e) we know that the socially optimal amount of education to provide is 50 units of education.
f. Given the subsidy in (e), calculate the value of consumer surplus with the subsidy (CS’), producer surplus with the subsidy (PS’). With the subsidy there are no longer any external benefits that the market fails to account for. Sum together CS’ + PS’: does this total equal the sum of (CS + PS + external benefits) + DWL from parts (c) and (d)?
Answer:
CS’ with the subsidy = (1/2)($110 per unit - $60 per unit)(50 units) = $1250
PS’ with the subsidy = (1/2)($60 per unit - $10 per unit)(50 units) = $1250
Sum of CS’ + PS’ = $2500
Sum of CS + PS + external benefit + DWL = $2475 + $25 = $2500
Return to the graph: all the shaded regions are now either CS’ or PS’ once the subsidy is instituted in this market. There is no DWL when MSC = MSB since the socially optimal amount of the good is produced.
7. Consider a community that has two residents, Bill and Amanda. Bill and Amanda would both like to see streetlights installed in their community and they are busy trying to decide what the optimal amount of streetlights for their community is and what price they should each contribute for each streetlight installed. Luckily they are both willing to reveal their preferences and so we do not have to worry about the free rider problem. Bill’s demand for streetlights is given by the equation Q = 10 – P and Amanda’s demand for streetlights is given by the equation P = 5 – (1/2)Q. The marginal cost of providing a streetlight is $3.
a. On your homework paper draw three graphs vertically one above the other. The first graph should be labeled “Bill’s demand”; the second graph should be labeled “Amanda’s demand”; and the third graph should be labeled “market demand”. On each graph the horizontal axis should be labeled “Quantity of Streetlights” while the vertical axis should be labeled “Price of Streetlights”. Now in each graph draw in the demand curve corresponding to your label. Remember that the market demand curve will be a vertical summation of the individual demand curves since a public good is non-rival.
Answer:
[pic]
b. Write an equation for the market demand curve for the public good.
Answer:
P = 15 – (3/2)Q
c. What is the optimal number of streetlights for this community? Show how you found this number.
Answer:
To find the optimal amount of streetlights equate the marginal cost curve to the demand curve:
MC = 3
P = 15 – (3/2)Q
So, 3 = 15 – (3/2)(Q
Q = 8 streetlights
d. What price per streetlight will Bill pay? What price per streetlight will Amanda pay? Why do Bill and Amanda pay different amounts for each streetlight that is produced?
Answer:
When 8 streetlights are produced, the price per streetlight is $3. To see this plug Q = 8 into the demand equation: P = 15 – (3/2)(Q) = $3 per streetlight.
To find the amount Bill will pay per streetlight, substitute Q = 8 into Bill’s demand curve: P = 10 – Q = 10 – 8 = $2 per streetlight.
Since Amanda is the only other person in this economy this implies that Amanda will pay $1 per streetlight so that the total of $3 per streetlight is collected from these two citizens. So, let’s check out what Amanda pays: P = 5 – (1/2)Q is Amanda’s demand curve. Substitute Q = 8 into this demand curve and solve for price: P = 5 – (1/2)Q = 5 - (1/2)(8) = $1 per streetlight.
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Jaeho
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